Present-Biased Preferences and Publicly Provided
Private Goods�
Thomas Aronsson and David Granlund
Submitted April 17, 2013; re-sumbitted September 29, 2013; �nal
submission, November 7, 2013
Abstract
This paper analyzes the welfare e¤ects of a publicly provided private good with
long-term consequences for individual well-being, in an economy where consumers
have "present-biased" preferences due to quasi-hyperbolic discounting. The analysis
is based on a two-type model with asymmetric information between the government
and the private sector, and each consumer lives for three periods. We present formal
conditions under which public provision to the young and middle-aged generation,
�Aronsson: Department of Economics, Umeå School of Business and Economics, Umeå University,
SE-901 87 Umeå, Sweden ([email protected]); Granlund: Department of Economics, Umeå
School of Business and Economics, Umeå University, SE-901 87 Umeå, Sweden, and HUI Research, SE-103
29 Stockholm, Sweden ([email protected]). The authors would like to thank the editor Ronnie
Schöb, two anonymous referees, and Tomas Sjögren for helpful comments and suggestions. Research
grants from the Bank of Sweden Tercentenary Foundation, the Swedish Council for Working Life and
Social Research, and the Swedish Tax Agency are also gratefully acknowledged.
1
respectively, leads to higher welfare. Our results show that quasi-hyperbolic dis-
counting provides a strong incentive for public provision to the young generation;
especially if the consumers are naive (instead of sophisticated).
Keywords: Public provision of private goods, health care, hyperbolic discounting,
intertemporal model, asymmetric information.
JEL classi�cation: D03, D61, H42, I18.
1 Introduction
There is now a considerable amount of research based on experiments suggesting that
consumers make dynamically inconsistent choices. The underlying behavioral failure is a
self-control problem caused by "present-biased" preferences, i.e. a tendency for the indi-
vidual to give less weight to the future welfare consequences of today�s actions than would
be optimal for the individual himself/herself in a longer time-perspective. A mechanism
that generates this behavior is quasi-hyperbolic discounting, where the individual, at any
time t, attaches a higher utility discount rate to tradeo¤s between periods t and t + 1
than to similar tradeo¤s in the more distant future.1 The resulting self-control problem
might be exempli�ed by a tendency to undersave or underinvest in health capital or human
capital; all of which may have serious welfare consequences.
The present paper develops a dynamic general equilibrium model, where each consumer
lives for three periods and su¤ers from a self-control problem generated by quasi-hyperbolic
discounting. The purpose is to analyze the welfare consequences of a publicly provided
private investment good with long-term consequences for individual well-being, exempli-
�ed by health care services. However, health care services are also interesting in their own
right, as governments devote much resources to the provision of health care in many coun-
tries. Since some of the bene�ts to the individual of such investments are likely to arise
in the future (in the form of increased health capital), whereas the costs arise at the time
1Experimental evidence pointing in this direction can be found in, e.g., Thaler (1981), Kirby and
Marakovic (1997), Kirby (1997), Viscusi, Huber and Bell (2008) and Brown, Chua and Camerer (2009).
In the latter two studies, estimates of the "hyperbolic parameter" (referred to as "�" below) are in the
interval 0:5 � 0:8 (instead of 1 as under exponential discounting). See also Fredrick, Loewenstein and
O�Donoghue (2002) for a review of empirical research on intertemporal choice, and Rubinstein (2003) for
a critical view of the evidence for hyperbolic discounting.
1
the investment is made, quasi-hyperbolic discounting is likely to imply that the invest-
ment made by the individual becomes too small from his/her own long-term perspective.2
Therefore, one would normally expect public provision to be welfare improving; yet, the
results presented below show that this is not necessarily the case. One important reason
is that the consumers may decrease both their current and future private purchases in
response to an anticipated future increase in the public provision. The intertemporal ad-
justments further imply that the welfare e¤ects of public provisions to di¤erent generations
interact.
As emphasized in earlier research, publicly provided private goods are important tools
for redistribution. Indeed, and based on model-economies where the consumers are fully
rational, Blomquist and Christiansen (1995, 1998) and Boadway and Marchand (1995)
show how the welfare e¤ects of public provision depend on whether such policies facili-
tate or hinder redistribution. Therefore, to examine how self-control problems a¤ect the
usefulness of publicly provided private goods, it is vital that corrective and redistributive
aspects of public policy are addressed simultaneously. We will follow this earlier liter-
ature in assuming that individual ability (productivity) is private information, whereas
income is observable and can be used as a basis for revenue collection and redistribution
subject to an incentive (self-selection) constraint. As such, our model is an extension of
2Although in contexts di¤erent from ours, empirical evidence shows that time-inconsistent preferences
may have an in�uence on health decisions at the individual level; for instance, that smokers are more
prone to hyperbolic discounting than non-smokers (Bickel et al., 1999; Odum et al., 2002); that food
purchase (measured in terms of calories) among food stamp recepients is consistent with hyperbolic
discounting (Shapiro, 2005); and that women�s preferences for medical treatment during child-birth may
undergo reverals during the birth-process in a way consistent with hyperbolic discounting (Christensen-
Szalanski, 1984). Also, Pol and Cairns (2002) �nd evidence for hyperbolic discounting with respect to
health outcomes based on a stated preference approach.
2
the two-type model originally developed by Stern (1982) and Stiglitz (1982), which is here
extended to allow for a time-inconsistent preference for immediate grati�cation through
quasi-hyperbolic discounting. Assuming that the tax revenue is raised through optimal
nonlinear taxes on labor income and capital income, our results show that the corrective
and redistributive motives for public provision are aligned if low-income consumers (either
the low-ability type or high-ability agents mimicking the low-ability type) purchase less
health care than high-income consumers.
Hyperbolic discounters are often described in terms of naivety or sophistication.3 A
naive consumer does not realize that future selves will be subject to the same self-control
problem, i.e., expects the time-inconsistent preference to vanish in the future. As such, the
naive consumer is characterized by time-inconsistent behavior in the sense that he/she may
revise the savings-investment plan in each subsequent period. A sophisticated consumer,
on the other hand, realizes that the same self-control problem also arises in future periods
and will, therefore, act strategically vis-a-vis his/her future selves. Since the distinction
between naivety and sophistication matters for public policy, i.e., the policy rule for public
provision under naivety di¤ers from the corresponding policy rule under sophistication,
we consider both cases below.4
The paper also relates to the literature on tax policy (or subsidy) responses, as well
3For a more thorough discussion, see, e.g., O�Donoghue and Rabin (1999).4To the best of our knowledge, the empirical evidence gives no clear guidance here. Based on experi-
mental data, Hey and Lotito (2009) �nd that the majority of agents were either naive or resolute (where
resolute means that agents stick to the plan preferred ex-ante), whereas sophistication was a less common
strategy. Evidence in favor of naivety is also presented in, e.g., DellaVigna and Malmendier (2006) and
Skiba and Tobacman (2008). See also Gine, Karlan and Zinman (2010) for behavioral patterns consistent
with sophistication. The review by DellaVigna (2009) shows behavioral patterns consistent with both
naivety and sophistication.
3
as responses in terms of public goods, to quasi-hyperbolic discounting (e.g., Gruber and
Köszegi, 2004; O�Donoghue and Rabin, 2003, 2006; Aronsson and Thunström, 2008; Aron-
sson and Sjögren, 2009; Aronsson and Granlund, 2011). To our knowledge, however, there
are no earlier studies on public provision of private goods in this particular context. Our
study serves to bridge this gap by considering the supplemental role of publicly provided
private goods when the income tax is optimal. Pirttilä and Tenhunen (2008) also address
public provision of private goods under optimal income taxation in an economy where
agents su¤er from bounded rationality. However, their study is based on a static model
combined with a "non-welfarist" approach, where the objective function of the govern-
ment di¤ers from that faced by the consumers. As such, their analysis is neither able to
address the intertemporal adjustment e¤ect described above nor the distinction between
naivety and sophistication. In Section 3 below, we compare our results with those derived
by Pirttilä and Tenhunen.
Our study is closely related to a paper by Aronsson and Sjögren (2009), which deals
with optimal mixed taxation under asymmetric information, in an economy where the con-
sumers su¤er from the same kind of self-control problem as in the present study. Therefore,
as the implications of quasi-hyperbolic discounting for optimal taxation are analyzed at
some length in their study, we focus on public provision here. The outline of the study
is as follows. Section 2 presents the model and characterizes the outcome of private op-
timization. In Section 3, we present the cost bene�t rules for public provision of private
goods to the young and middle-aged generation, respectively, as well as relate these policy
rules to whether the consumers are characterized by naivety or sophistication. The results
are summarized and discussed in Section 4.
4
2 The Model
To simplify the analysis as much as possible, the production side of the model is represented
by a linear technology. This means that the producer prices and factor prices (before-tax
hourly wage rates and interest rate) are �xed in each period,5 although not necessarily
constant over time.
Turning to the consumption side, we assume that each consumer lives for three periods:
works in the �rst and second, and is retired in the third. At least three periods are required
to model the time-inconsistent preference that quasi-hyperbolic discounting gives rise to.6
The consumers di¤er with respect to productivity and can be divided in two ability-types:
a low-ability type (denoted by superindex 1) earning wage rate w1 and a high-ability
type (denoted by superindex 2) earning wage rate w2 > w1. For simplicity, we abstract
from population growth and normalize the number of consumers of each ability-type and
generation to one. The instantaneous utility functions facing ability-type i (i = 1; 2) of
generation t - who is young in period t, middle-aged in period t+1 and old in period t+2
- can be written as5Similar assumptions have been used in some of the previous studies referred to above (e.g., Blomquist
and Christiansen, 1995, 1998; Pirttilä and Tenhunen, 2008). For exceptions, see Pirttilä and Tuomala
(2002) dealing with productivity and relative wage e¤ects of publicly provided private goods, and Aronsson
et al. (2005) analyzing how the appearance of equilibrium unemployment a¤ects the incentives for public
provision.6To be more speci�c, to capture the preference reversals implied by quasi-hyperbolic discounting, the
model must allow the consumer to make intertemporal (saving and investment) choices at least twice
during the life-cycle.
5
ui0;t = v(ci0;t; zi0;t) + f(h
i0;t) (1)
ui1;t+1 = v(ci1;t+1; zi1;t+1) + f(h
i1;t+1) (2)
ui2;t+2 = v(ci2;t+2;_
l ) + f(hi2;t+2), (3)
where c denotes the consumption of a numeraire good, z leisure and h the stock of health
capital. Subindices 0, 1 and 2 indicate that the consumer is young, middle-aged and
old, respectively. The functions v(�) and f(�) are increasing in their arguments, strictly
concave, and all goods are assumed to be normal. Leisure is de�ned as a time endowment,_
l , less the time spent in market work, l. For analytical convenience, the health capital
stock is assumed to enter the utility function in a separable way.
An alternative formulation would have been to assume - as did Grossman (1972) -
that health capital also (in addition to the direct e¤ects displayed above) enters utility
via the time constraint by reducing the time lost (from market work and non-market
activities) due to illness. Such an extension would divide the marginal bene�t of health
capital into two components, i.e. a direct marginal bene�t (as above) and an indirect
marginal bene�t via the preference for leisure, which is most likely realistic. Yet, except
for this modi�cation, such an extension would not change the cost bene�t rules for publicly
provided health care, which leads us to rely on the simpler utility formulation given by
equation (1)-(3).
Following the approach developed by Phelps and Pollak (1968), Laibson (1997) and
O�Donoghue and Rabin (2003), the intertemporal objective of any generation t is given by
U i0;t = ui0;t + �
i2Pj=1
�juij;t+j, (4)
6
where �j = 1= (1 + �)j is a conventional (exponential) utility discount factor with utility
discount rate �, whereas �i 2 (0; 1) is a type-speci�c time-inconsistent preference for
immediate grati�cation.7 ;8
Our concern is to analyze whether the disincentive to invest in health capital due
to quasi-hyperbolic discounting may justify public provision of health care services. As
a consequence, we focus attention on the intertemporal aspects of such investments, by
assuming that the investment in health capital (i.e. the use of health care services) in
period t a¤ects the stock of health capital in period t+1, while suppressing any atemporal
(within-period) relationship between the use of health care services and the stock of health
capital (which is not directly distorted by quasi-hyperbolic discounting).9 The health
capital stock facing the young ability-type i is �xed at hi0;t. For the middle-aged and old,
respectively, the health capital stock depends on past investments according to
hi1;t+1 = hi0;t� +mi0;t (5)
hi2;t+2 = hi1;t+1� +mi1;t+1 (6)
7With hyperbolic discounting, the discount factor is represented by a hyperbolic function, where the
discount rate decreases as the tradeo¤ occurs further in the future. Quasi-hyperbolic discounting is a
discrete approximation, such that the tradeo¤ between the present period and future periods is discounted
at a higher rate than the rate currently applied to tradeo¤s in the more distant future.8It is not important for the qualitative results derived below that � di¤ers between the ability-types.
Yet, we still allow for such heterogeneity since it gives a more general model, while having negligible costs
in terms of additional notational complexity.9We realize, of course, that most aspects of health care may have both atemporal (within-period) and
intertermporal e¤ects of the stock of health capital. However, since the appearance of quasi-hyperbolic
discounting only a¤ects the incentives underlying investment behavior, and not those underlying atemporal
within-period decisions, adding within-period relationships between the use of health care services and
the stock of health capital would not a¤ect our understanding of how quasi-hyperbolic discounting may
motivate public provision of health care services.
7
where � 2 (0; 1) is a depreciation factor - de�ned as "one minus the depreciation rate" -
while mi0;t and m
i1;t+1 are the �ow-services of health care used by the young and middle-
aged selves.10 We have simpli�ed by assuming a linear relationship between the use of
�ow-services of health care and the health capital stock in the next period. The same
qualitative results as those derived below will also apply in a more general model where
the marginal e¤ect of m is decreasing.
Flow-services of health care may be privately purchased on the market or publicly
provided free of charge; each consumer may, therefore, top up the level that the government
provides via his/her own private purchases. This means that the �ow-services of health
care used by the young consumer can be characterized as mi0;t = g0;t+ xi0;t, where g0;t
is the amount publicly provided and xi0;t the private purchase. An analogous de�nition
applies for the middle-aged. Notice that the government is not allowed to provide di¤erent
levels of health care to the two ability-types, although it may target di¤erent age-groups
di¤erently. Throughout the paper, we assume that health care services cannot be resold.
Let s denote savings and r denote the interest rate; in addition, let yi0;t = wi0;tli0;t
and yi1;t+1 = wi1;t+1li1;t+1 denote the labor income of the young and middle-aged, respec-
tively, and I i1;t+1 = si0;trt+1 and Ii2;t+2 = si1;t+1rt+2 denote the capital income facing the
middle-aged and old, respectively. There are no bequests here; the initial endowment
of wealth by each young consumer is zero. Using this notation, the income tax pay-
ment for each of the three phases of the life-cycle can be written as T i0;t = T0;t�yi1;t; 0
�,
T i1;t+1 = T1;t+1�yi1;t+1; I
i1;t+1
�and T i2;t+2 = T2;t+2
�0; I i2;t+2
�.
10Although it is likely that the depreciation rate increases with age, we refrain from modeling aged-
dependent depreciation here. The reason is that using di¤erent depreciation factors in equations (5) and
(6) would not alter our qualitative results.
8
The individual budget constraint is then given by
yi0;t � T i0;t � si0;t = ci0;t + xi0;t (7)
si0;t + Ii1;t+1 + y
i1;t+1 � T i1;t+1 � si1;t+1 = ci1;t+1 + x
i1;t+1 (8)
si1;t+1 + Ii2;t+2 � T i2;t+2 = ci2;t+2 (9)
where the prices of c and x have been normalized to one. Notice that the old consumer
does not invest in health capital in our model, since there would be no future bene�t
associated with such investments.
2.1 Consumer choices
As mentioned above, it is not a priori clear how consumers deal with their self-control
problems, and we shall, therefore, make a distinction between naivety and sophistication.
In technical terms, naivety is a special case of a model with sophisticated consumers,
since the �rst order conditions for consumption and savings faced by a naive consumer
are interpretable as special cases of those obeyed by their sophisticated counterparts.
Therefore, to shorten the presentation as much as possible, we use sophistication as a
reference case and then discuss how the �rst order conditions simplify in the special case
of naivety.
Also, as the sophisticated consumer implements a time-consistent consumption/savings
plan, we begin by analyzing the behavior of the middle-aged generation and then continue
with the young generation. For the middle-aged, there is no technical distinction between
naivety and sophistication. The reason is, of course, that the old self does not make
any forward-looking decisions, implying that the middle-aged self has no direct incentive
to modify the behavior of the old self. In fact, in the model described above, the old
9
generation makes no active decision; each old consumer just uses his/her remaining as-
sets for consumption. We have used this particular set up for simplicity, as the possible
(atemporal) trade-o¤s faced by the elderly are not a¤ected by discounting.
2.1.1 Decisions Made by the Middle-Aged Generation
Following the literature on optimal mixed taxation under asymmetric information (e.g.,
Edwards, Keen and Tuomala, 1994), the consumer-choices are analyzed in two stages; in
the �rst, we derive commodity demand functions (for c and x) conditional on the hours
of work and savings; in the second, we derive the labor supply and savings functions. The
reason for using this particular approach is that the conditional demand functions will be
useful in the policy-problem presented below.
For the middle-aged, the �rst stage problem means choosing ci1;t+1 and xi1;t+1 to max-
imize ui1;t+1 + �i�ui2;t+2, i.e. the remaining life-time utility when middle-aged, subject to
the nonnegativity constraint xi1;t+1 � 0; the health capital function (6); and the following
budget constraint:
bi1;t+1 = ci1;t+1 + xi1;t+1 (10)
bi2;t+2 = ci2;t+2, (11)
where b is �xed net income adjusted for savings (see below). By substituting equations
(10)-(11) into the utility function and using that @hi2;t+2=@xi1;t+1 = 1, we can then write
the Kuhn-Tucker conditions for xi1;t+1 as
10
�@ui1;t+1@ci1;t+1
+ �i�@ui2;t+2@hi2;t+2
= Ai1;t+1 � 0 (12)
xi1;t+1Ai1;t+1 = 0. (13)
In the Kuhn-Tucker conditions (12) and (13), the self-control problem shows up as an
adjustment of the weight attached to the future marginal utility of health capital (through
the parameter �i).11
If the nonnegativity constraint does not bind, equations (10)-(13) imply the following
conditional demand functions:
ni1;t+1 = ni1
�bi1;t+1; z
i1;t+1; (x
i0;t + g0;t)� + g1;t+1
�for n = c; x. (14)
Equation (14) relates the demand (for the numeraire good and private health care services)
by the middle-aged consumer to his/her current levels of disposable income (adjusted for
savings) and leisure, as well as to the level of publicly provided health care to the middle-
aged and the total past consumption of health care services (publicly provided as well as
privately purchased). Equation (14) is also a reaction function, as it describes how the
young consumer can in�uence the consumption choices made by his/her middle-aged self.
11As indicated above, if we like Grossman (1972) were to assume that health capital also a¤ects the
time lost due to illness or injury, , the time constraint of the old consumer would become zi2;t+2 =
�l � i2;t+2(hi2;t+2), such that �rst order condition (12) changes to read
�@ui1;t+1@ci1;t+1
+ �i�
"@ui2;t+2@hi2;t+2
+@ui2;t+2@zi2;t+2
@zi2;t+2
@ i2;t+2
@ i2;t+2@hi2;t+2
#� 0;
where @zi2;t+2=@ i2;t+2 = �1 and @ i2;t+2=@hi2;t+2 < 0. The expression within the square-bracket rep-
resents the total marginal utility of health capital, which in this case is decomposable into two positive
terms; the �rst representing a direct e¤ect of health capital and the second an indirect e¤ect through the
time constraint. The latter e¤ect is not included in the simpler expression (12) above.
11
The labor supply and savings behavior of the middle-aged consumer is analyzed by
choosing li1;t+1 and si1;t+1 to maximize u
i1;t+1 + �
i�ui2;t+2 subject to the health capital
function (6), the conditional demand functions (14), and the following budget constraint:
bi1;t+1 = si0;t (1 + rt+1) + wi1;t+1l
i1;t+1 � T i1;t+1 � si1;t+1 (15)
bi2;t+2 = si1;t+1 (1 + rt+2)� T i2;t+2. (16)
If we de�ne the marginal net wage rate !i1;t+1 = wi1;t+1
�1� @T i1;t+1=@yi1;t+1
�and marginal
net interest rate �i2;t+2 = ri2;t+2
�1� @T i2;t+2=@I i2;t+2
�, the �rst order conditions for hours of
work and savings can be written as
@ui1;t+1@ci1;t+1
!i1;t+1 �@ui1;t+1@zi1;t+1
= 0 (17)
�@ui1;t+1@ci1;t+1
+ �i��1 + �i2;t+2
� @ui2;t+2@ci2;t+2
= 0. (18)
Since quasi-hyperbolic discounting does not distort the atemporal tradeo¤ between con-
sumption and leisure, equation (17) is a standard labor supply condition. Equation (18)
shows that the middle-aged consumer saves less than he/she would have done without
quasi-hyperbolic discounting, i.e., if �i = 1. Equations (17) and (18) imply the following
labor supply and saving functions (in which variables other than those decided upon by
the consumer�s young self have been suppressed)
li1;t+1 = li1�si0;t;m
i0;t
�(19)
si1;t+1 = si1�si0;t;m
i0;t
�. (20)
12
By analogy to equation (14) above, equations (19) and (20) are also interpretable as
reaction functions, relating the middle-aged consumer�s labor supply and savings behavior
to his/her savings and health investments as young. The partial derivatives of equations
(19) and (20) with respect to si0;t and mi0;t cannot be signed unambiguously.
2.1.2 Decisions Made by the Young Generation
Turning to the young generation, the distinction between naivety and sophistication be-
comes important. As we mentioned above, a sophisticated consumer recognized that the
self-control problem will also appear in future periods, and the young sophisticated con-
sumer will act strategically to in�uence the incentives faced by his/her middle-aged self.
This motive for strategic behavior is absent under naivety (as the young naive consumer
erroneously expects the self-control problem to vanish in the future). In the following, we
derive the optimality conditions obeyed by sophisticated consumer, and then explain how
these conditions simplify under naivety.
The objective function faced by the young ability-type i is given by
U i0;t = ui0;t + �
i�V i1;t+1, (21)
where
V i1;t+1 = ui1;t+1 +�u
i2;t+2 (22)
is the intertemporal objective that the young consumer would like his/her middle-aged
self to maximize (which the middle-aged self does not, as his/her objective is given by
ui1;t+1 + �i�ui2;t+2). In particular, note that equation (22) does not contain the parameter
�i.
13
To derive conditional demand functions for the numeraire good and health care services,
we maximize equation (21) with respect to ci0;t and xi0;t subject to equations (5)-(6), (10)-
(11), (14), (15)-(16), and (19)-(20) as well as subject to the following budget constraint
bi0;t = ci0;t + x
i0;t. (23)
By substituting the budget constraint into the objective function and using @hi2;t+2=@xi1;t+1 =
@hi1;t+1=@xi0;t = 1, the Kuhn-Tucker condition for x
i0;t becomes
�@ui0;t@ci0;t
+ �i��@ui1;t+1@hi1;t+1
+�2@ui2;t+2@hi2;t+2
�
�
+�1� �i
��i�2
@ui2;t+2@hi2;t+2
@xi1;t+1@xi0;t
+�1� �i
��i�2
��1 + �i2;t+2
� @ui2;t+2@ci2;t+2
�@ui2;t+2@hi2;t+2
@xi1;t+1@bi1;t+1
�@si1;t+1@xi0;t
��1� �i
��i�2
@ui2;t+2@hi2;t+2
@~xi1;t+1@zi1;t+1
@li1;t+1@xi0;t
= Ai0;t � 0 (24)
xi0;tAi0;t = 0 (25)
where @~xi1;t+1=@zi1;t+1 = @x
i1;t+1=@z
i1;t+1 �MRSiz;c;t+1[@xi1;t+1=@bi1;t+1] measures the change
in the conditional compensated demand for health care services following increased use
of leisure, while MRSiz;c;t+1 = (@ui1;t+1=@zi1;t+1)=(@u
i1;t+1=@c
i1;t+1) is the marginal rate of
substitution between leisure and the numeraire good faced by the consumer�s middle-aged
self.12
The �rst row of (24) - which is analogous to (12) faced by the middle-aged consumer -
comprises the marginal e¢ ciency condition for xi0;t that would characterize a young naive
12To derive expression (24), note that by substituting the consumer�s budget constraint into equation
14
consumer. It shows that a naive consumer will choose ci0;t and xi0;t so that the marginal
utility of numeraire consumption equals the sum of discounted marginal utilities of health
capital when middle-aged and old, respectively. The intuition is that the health investment
made when young will directly a¤ect the health capital stock both when middle-aged
and old according to equations (5) and (6). The second, third and fourth rows are due
to sophistication and show how the young consumer will adjust his/her consumption of
health care services to in�uence the consumption, savings and labor supply decisions made
by his/her middle-aged self. In particular, notice that all these terms are proportional to
1 � �i: the intuition is that the middle-aged individual discounts his/her future utility
by the discount factor �i�, whereas the young self wants the middle-aged self to use the
discount factor �. As such, 1 � �i is the "weight" that the young consumer attaches to
this discrepancy. The reason as to why the second, third and fourth rows vanish under
naivety is that a naive consumer has no incentive to a¤ect the choices made by his/her
middle-aged self, as the naive consumer erroneously expects not to be subject to this
self-control problem in the future. Another - yet related - di¤erence between naivety and
sophistication, therefore, is that the naive consumer underestimates the future marginal
utility of health (as he/she overestimates the future stock of health capital).
To provide some further intuition, notice that the second row of (24) is negative, since
(21) and then di¤erentiating with respect to xi0;t, we obtain the �rst order condition
0 � �@ui0;t@ci0;t
+ �i
"�@ui1;t+1@hi1;t+1
+�2@ui2;t+2@hi2;t+2
�
#
+�i�
"@V i1;t+1@xi1;t+1
@xi1;t+1@xi0;t
+@V i1;t+1@si1;t+1
@si1;t+1@xi0;t
+@V i1;t+1@li1;t+1
@li1;t+1@xi0;t
#.
Expression (24) can then be derived by writing the derivatives @V i1;t+1=@xi1;t+1, @V
i1;t+1=@s
i1;t+1 and
@V i1;t+1=@li1;t+1 in terms of the private �rst order condition for x
i1;t+1, s
i1;t+1 and l
i1;t+1, respectively.
15
@xi1;t+1=@xi0;t 2 (��; 0).13 As such, this component contributes to reduce the sophisticated
young consumer�s health investment, ceteris paribus; a choice made to induce his/her
middle-aged self to invest more in health capital.14 Furthermore, this e¤ect is reinforced
if we simplify by adding the assumption that li1;t+1 is �xed, in which case we can derive
@si1;t+1=@xi0;t 2 (0;�@xi1;t+1=@xi0;t), such that the sum of the second and third rows of (24)
can be written as
�1� �i
��@ui1;t+1@ci1;t+1
�@xi1;t+1@xi0;t
+
�1�
@xi1;t+1@bi1;t+1
�@si1;t+1@xi0;t
�< 0. (26)
The sign of the fourth row of (24) depends on whether the use of health care services by the
middle-aged self is complementary with, or substitutable for, leisure, and how an increase
in xi0;t a¤ects the hours of work supplied by the middle-aged ability-type i. Therefore,
in the general case, the strategic incentive faced by sophisticated young consumers may
either contribute to larger or smaller investments in health capital.
If the nonnegativity constraint does not bind, equations (23) and (24) imply the follow-
ing conditional demand functions (if de�ned conditional on the use of leisure both when
young and when middle-aged);
ni0;t = ni0
�bi0;t; z
i0;t; b
i1;t+1; z
i1;t+1; g0;t; g1;t+1
�for n = c; x. (27)
As mentioned in the introduction, although the present study presupposes that the
income taxes are optimally chosen, we do not discuss income tax policy in what follows.
13Recall from equation (14) that
xi1;t+1 = xi1�bi1;t+1; z
i1;t+1; (x
i0;t + g0;t)� + g1;t+1
�,
where @xi1;t+1=@(xi0;t�) 2 (�1; 0). Therefore, @xi1;t+1=@xi0;t = �[ @xi1;t+1=@(x
i0;t�)] 2 (��; 0).
14A related result of strategic undersaving was found by Diamond and Köszegi (2004), where the agent
reduces his/her savings in order to induce his/her future self to work.
16
Therefore, to shorten the presentation, we present the �rst order conditions for labor
supply and savings faced by the young consumer in the Appendix, as these conditions will
not be used in the study of costs and bene�ts of publicly provided private goods.
3 Public Provision of Private Goods
The government wants to redistribute as well as correct for the self-control problem de-
scribed above. Therefore, since the (paternalist) government would like the consumers to
behave as if the self-control problem were absent, the government does not discount the fu-
ture hyperbolically (meaning that �1 = �2 = 1 from the point of view of the government).15
Accordingly, and if we assume a utilitarian type of policy objective, the contribution to
social welfare by ability-type i of generation t can be written as
V i0;t = ui0;t +
2Pj=1
�juij;t+j. (28)
Since the consumers are assumed to discount the future hyperbolically, equation (28) di¤ers
from the corresponding utility function faced by the young ability-type i of generation t,
U i0;t, given by equation (4). The social welfare function becomes
W =Pt
Pi
�tV i0;t. (29)
For all t, the resource constraint can be written as
15This way of modeling the objective of a paternalist government is in line with earlier comparable
literature; see, e.g., O�Donoghue and Rabin (2003, 2006), Aronsson and Thunström (2008) and Aronsson
and Granlund (2011).
17
Pi
�wi0;tl
i0;t + w
i1;tl
i1;t
�+Kt(1 + rt)�Kt+1
�Pi
�ci0;t + c
i1;t + c
i2;t +m
i0;t +m
i1;t
�= 0, (30)
where Kt is the capital stock at the beginning of period t, which depends on savings in
period t� 1. Since the government can make lump-sum payments between periods as well
as control the capital stock via the nonlinear income taxes, it is not necessary to include
the government�s budget constraint in the public decision-problem, given that the resource
constraint is included (Atkinson and Sandmo 1980, Pirttilä and Tuomala 2001).
We make the conventional assumptions about information: the government can observe
income, whereas ability is private information. We also assume that the government wants
to redistribute from the high-ability to the low-ability type. As a consequence, it must
prevent the high-ability type from pretending to be a low-ability type, i.e., from becoming
a mimicker. This is accomplished by imposing a self-selection constraint, implying that
the high-ability type (at least weakly) prefers the combination of disposable income and
hours of work intended for him/her over the combination intended for the low-ability type.
Note that the hours of work that the high-ability type needs to supply in order to reach
the same labor income as the low-ability type is given by bl20;t = �w10;t=w20;t� l10;t when youngand by bl21;t+1 = �w11;t+1=w21;t+1� l11;t+1 when middle-aged. In the following, all variables witha hat,b, refer to the mimicker. In the same way as for the true low and high-ability types,we can, if the non-negative constraints for x do not bind, de�ne the conditional demand
functions for the mimicker as
18
bn20;t = n20�b10;t; bz20;t; b11;t+1; bz21;t+1; g0;t; g1;t+1� for n = c; x (31)
bn21;t+1 = n21�b11;t+1; bz21;t+1; (bx20;t + g0;t)� + g1;t+1� for n = c; x (32)
where, bz20;t = _
l � bl20;t and bz21;t+1 = _
l � bl21;t+1. The mimicker receives the same labor andcapital income as the low-ability type. However, as the mimicker is more productive than
the low-ability type, the mimicker spends more time on leisure, meaning that equations
(31) and (32) generally di¤er from the corresponding conditional demand functions faced
by the low-ability type. This means, in turn, that the mimicker and the low-ability type
have di¤erent health capital stocks when middle-aged and old, respectively, even if their
initial stocks were to coincide.
The self-selection constraint can be written as
U20;t = u20;t + �
22Pj=1
�ju2j;t+j � bU20;t = bu20;t + �2 2Pj=1
�jbu2j;t+j (33)
where the de�nitions of bu2j;t+j for j = 0; 1; 2, are analogous to those for true low- and
high-ability types given by equations (1)-(3).
If de�ned conditional on the publicly provided private good (the cost bene�t rule for
which will be addressed later), the second best problem will be to choose li0;t, bi0;t, l
i1;t,
bi1;t, bi2;t (for i = 1; 2) and Kt for all t to maximize the social welfare function given
by equation (29), subject to the accumulation equations for health capital (5)-(6), the
self-selection constraint (33), the resource constraint (30), and the conditional demand
functions (14),(27) and (31)-(32).16
16As the government is equipped with nonlinear taxes on labor and capital income by assumption, it is
able to implement any desired combination of work hours and disposable income for each ability-type and
19
The Lagrangean corresponding to this policy problem is presented in the Appendix
together with the associated �rst order conditions for work hours, disposable income and
the capital stock, which re�ect an optimal income tax policy implemented for generation
t. Our concern is then to analyze the welfare e¤ects of publicly provided private goods
given that the income taxes are optimal. Also, we follow some of the earlier literature on
optimal nonlinear income taxation in dynamic models in assuming that the government
can credibly commit to the announced tax and expenditure policies.17
We start by analyzing public provision to the young generation and then continue with
public provision to the middle-aged.
3.1 Public Provision to the Young
To facilitate comparison with earlier research, we begin by brie�y discussing public provi-
sion under the assumption that the consumers do not discount the future hyperbolically,
i.e. behave as if �i = 1 for i = 1; 2. We will then return to the assumption that the con-
sumers discount hyperbolically and examine the welfare e¤ect of publicly provided private
goods to the young generation under naivety as well as sophistication.
generation, as well as an optimal path for the capital stock, subject to the self-selection, health capital
and resource constraints. It is, therefore, convenient to write the second best problem as a direct decision-
problem where the government (or social planner) directly decides upon work hours and disposable income
for each ability-type and generation as well as the capital stock.17See, e.g., Brett (1997), Pirttilä and Tuomala (2001), Aronsson et al. (2009) and Aronsson and
Johansson-Stenman (2010). Situations where the government implements a time-consistent policy without
commitment are analyzed by, e.g., Brett and Weymark (2008) and Aronsson and Sjögren (2009).
20
3.1.1 Without the Self-Control Problem
The total consumption of health care services by the young ability-type i is given by
mi0;t = g0;t + x
i0;t. Now, let
dmi0;t
dg0;t= 1 +
@xi0;t@g0;t
�@xi0;t@bi0;t
(34)
dmi1;t+1
dg0;t=
@xi1;t+1@g0;t
+@xi1;t+1@xi0;t
�@xi0;t@g0;t
�@xi0;t@bi0;t
�(35)
denote how mi0;t and m
i1;t+1, respectively, responds to a tax-�nanced increase in g0;t. The
responses by the mimicker are analogous. Then, if the consumers behave as if �1 = �2 = 1,
we show in the Appendix that the welfare e¤ect of an increase in g0;t can be written as
@W
@g0;t= �t
Xi
��@V i0;t@mi
0;t
�@V i0;t@ci0;t
�dmi
0;t
dg0;t+
�@V i0;t@mi
1;t+1
�@V i0;t@ci1;t+1
�dmi
1;t+1
dg0;t
�
+�t
"�@V 20;t@m2
0;t
�@V 20;t@c20;t
�dm2
0;t
dg0;t� @ bV 20;t@ bm2
0;t
�@ bV 20;t@bc20;t
!dbm2
0;t
dg0;t
#(36)
+�t
"�@V 20;t@m2
1;t+1
�@V 20;t@c21;t+1
�dm2
1;t+1
dg0;t� @ bV 20;t@ bm2
1;t+1
�@ bV 20;t@bc21;t+1
!dbmi
1;t+1
dg0;t
#.
As we assume away quasi-hyperbolic discounting here, the consumer objective, U i0;t, be-
comes equal to the individual contribution to the social welfare function, V i0;t, for each
ability-type. Note �rst that an increase in g0;t a¤ects the instantaneous utility via the
consumption of health care services both when young and when middle-aged, i.e. via
mi0;t and m
i1;t+1, respectively, which explains the �rst row of equation (36). The second
and third rows appear because a change in g0;t a¤ects the self-selection constraint via the
consumption of health care services by the young high-ability type and young mimicker
21
(the second row), and via the consumption of health care services by the middle-aged
high-ability type and middle-aged mimicker (the third row).18
Equation (36) is just an intertemporal analogue to formulas derived in static models.
If g0;t is small enough to imply that the nonnegativity constraint attached to xi0;t does not
bind, then the �rst term within brackets on the right hand side of equation (36) vanishes
because the consumer has made an optimal choice, i.e.
@V i0;t@mi
0;t
�@V i0;t@ci0;t
= �@ui1;t+1@hi1;t+1
+�2@ui2;t+2@hi2;t+2
� �@ui0;t@ci0;t
= 0. (37)
Analogous results apply for the young mimicker if bx20;t > 0, as well as for the middle-
aged true ability-types (if xi1;t+1 > 0, for i = 1; 2) and the middle-aged mimicker (if
x21;t+1 > 0), respectively. Furthermore, with xi0;t > 0, it also follows that dmi0;t=dg0;t =
1+@xi0;t=@g0;t�@xi0;t=@bi0;t = 0, simply because each consumer adjusts his/her own private
consumption of health care services such that the total consumption remains unchanged.
As g0;t continues to increase, one of the nonnegativity constraints will eventually be-
come binding. For instance, at the point where the young ability-type i becomes crowded
out, we have @V i0;t=@mi0;t�@V i0;t=@ci0;t < 0 and dmi
0;t=dg0;t = 1, meaning that the �rst term
on the right hand side of equation (36) contributes to lower welfare (as ability-type i is
forced to consume more health care services than he/she prefers). Similarly, if the young
mimicker becomes crowded out, then the second term in the second row contributes to
higher welfare, i.e. ��t[@V 20;t=@m20;t�@V 20;t=@c20;t] > 0. The intuition is that decreased util-
ity for the mimicker leads to a relaxation of the self-selection constraint. The components
18With reference to foonote 11, note that equation (36) would take the same general form if we were to
assume that health capital also a¤ects the time available for market work and nonmarket activities. The
only e¤ect would be to add an extra component to the marginal utility of health capital in equations such
as (37).
22
referring to the middle-aged in equation (36) have analogous interpretations. In other
words, public provision is welfare improving if the mimicker becomes crowded out �rst,
which is analogous to results derived in earlier literature on public provision of private
goods under optimal income taxation.
As we mentioned above, Pirttilä and Tuomala (2002) also address public provision of
private goods under nonlinear income taxation in an OLG model. In their study, the
consumers live for two periods, and the government provides education (the consumption
of which the individuals can top up through private purchases). They derive a formula that
resembles equation (36); yet with two important modi�cations. First, since education leads
to human capital accumulation that (partly) carries over to future generations in their
study, public provision at time t also a¤ects the welfare of future generations (through
endogenous relative wages and human capital externalities). Second, due to their focus on
human capital and assumption that agents only live for two periods, they do not distinguish
between behavioral responses of di¤erent age groups, as we do. In our framework, the
consumers may adjust their consumption also in the intertemporal dimension: if the young
consumer becomes crowded out, this e¤ect is partly o¤set via adjustments made by the
middle-aged self, given that the nonnegativity constraint faced by the middle-aged self
does not bind. As will be explained in greater detail below, this reduces the size of the
welfare e¤ect, although it does not change the qualitative result.
3.1.2 Naive Consumers with Present-Biased Preferences
If the consumers have present-biased preferences, we show in the Appendix that the ana-
logue to equation (36) can be written as
23
@W
@g0;t= �t
Xi
��@V i0;t@mi
0;t
�@V i0;t@ci0;t
�dmi
0;t
dg0;t+
�@V i0;t@mi
1;t+1
�@V i0;t@ci1;t+1
�dmi
1;t+1
dg0;t
�
+�t
"�@U20;t@m2
0;t
�@U20;t@c20;t
�dm2
0;t
dg0;t� @ bU20;t@ bm2
0;t
�@ bU20;t@bc20;t
!dbm2
0;t
dg0;t
#(38)
+�t
"�@U20;t@m2
1;t+1
�@U20;t@c21;t+1
�dm2
1;t+1
dg0;t� @ bU20;t@ bm2
1;t+1
�@ bU20;t@bc21;t+1
!dbmi
1;t+1
dg0;t
#.
The di¤erence compared to equation (36) is that the �rst and second rows of equation
(38) contain derivatives of U20;t and bU20;t instead of V 20;t and bV 20;t. These components serve toprevent mimicking and are associated with the self-selection constraint; as such, they re�ect
the actual consumer-objective (not the social welfare function). This is important because
the objective function facing ability-type i, U i0;t, will di¤er from his/her contribution to
the social welfare function, V i0;t, if the consumers have present-biased preferences.
Earlier studies based on model-economies where the consumers are fully rational show
that public provision of private goods can be welfare improving if the mimicker is crowded
out �rst (e.g., Boadway and Marchand, 1995; Blomquist and Christiansen, 1995). We
have derived the following result from equation (38):
Proposition 1 Suppose that either the mimicker or the low-ability type is crowded out
�rst, i.e., x20;t > min�x10;t; x
20;t
when g0;t = 0. Then, if the consumers have present-biased
preferences and are naive, there exists a level of g0;t > 0 for which the welfare is strictly
higher than without public provision.
The proof of Proposition 1 is straight forward. Suppose �rst that g0;t is small enough
to imply xi0;t > 0 and xi1;t+1 > 0. This means that the �rst row of equation (38) is
zero, because dmi0;t=dg0;t = 0 and dm
i1;t+1=dg0;t = 0 (as in the absence of the self-control
24
problem), because the consumer adjusts his/her private consumption of health care services
to maintain the total consumption of health care services at the desired level. However, the
expressions within parenthesis in the �rst row are no longer equal to zero, since the self-
control problem discussed here implies that each consumer uses less health care services
than preferred by the paternalistic government, i.e.19
@V i0;t@mi
0;t
�@V i0;t@ci0;t
=�1� �i
���@ui1;t+1@hi1;t+1
+�2@ui2;t+2@hi2;t+2
�
�> 0 (39)
@V i0;t@mi
1;t+1
�@V i0;t@ci1;t+1
=�1� �i
��2@ui2;t+2@hi2;t+2
> 0. (40)
Therefore, at the point where the nonnegativity constraint becomes binding we have
dmi0;t=dg0;t = 1, which in combination with equation (39) means that welfare increases
via the �rst term on the right hand side of equation (38). This welfare increase is, in turn,
partly (yet not fully) o¤set by the intertemporal adjustment made by the middle-aged self
when xi0;t = 0. To see this, note that dmi1;t+1=dg0;t = @x
i1;t+1=@g0;t if x
i0;t = 0. We can then
write the �rst row of equation (38) as follows by combining equations (39) and (40);
�@V i0;t@mi
0;t
�@V i0;t@ci0;t
�dmi
0;t
dg0;t+
�@V i0;t@mi
1;t+1
�@V i0;t@ci1;t+1
�dmi
1;t+1
dg0;t
=�1� �i
� ��@ui1;t+1@hi1;t+1
+�2@ui2;t+2@hi2;t+2
�� +
@xi1;t+1@g0;t
��, (41)
19To derive equation (39), take the the derivative of equation (28) with respect to mi0;t, while using
equations (5) and (6). Then, take the derivative of equation (28) with respect to ci0;t and substitute for
@ui0;t=@ci0;t using the �rst order condition of the consumer, (24), keeping in mind that the second, third
and fourth rows vanish under naivety. Equation (40) can be derived in the same general way.
25
which is positive even if @xi1;t+1=@g0;t approaches ��.20 That the intertemporal adjustment
e¤ect does not eliminate the gain of public provision is explained by the assumption that
the consumers�instantaneous utilities are time-separable, meaning that increased health
when middle-aged does not reduce the utility of health when old. Therefore, a consumer�s
behavioral response to a larger health capital stock when middle-aged will never lead to a
smaller health capital stock when old. Note �nally that if the middle-aged self is crowded
out �rst, so xi1;t+1 = 0, then dmi1;t+1=dg0;t = 0 and the (negative) intertemporal adjustment
e¤ect vanishes.
It is now straight forward to see that Proposition 1 applies. Suppose that we were
to increase the public provision up to a point where either the low-ability type or the
mimicker (or both of them) is crowded out. If the low-ability type is crowded out �rst, the
welfare gain is given by equation (41) above; if the mimicker is crowded out �rst, there
is a welfare gain due to the relaxation of the self-selection constraint (as discussed in the
previous subsection). However, if we were to assume that the high-ability type is crowded
out �rst, we have two counteracting e¤ects; a welfare gain described by equation (41) and
a welfare loss due to a tighter self-selection constraint.
3.1.3 Sophisticated Consumers with Present-Biased Preferences
Note that equation (38) provides a general characterization of the welfare e¤ect of in-
creased public provision, and is written on a format that applies irrespective of whether
the consumers are naive or sophisticated. However, the signs of the expressions in paren-
theses (i.e. the di¤erence between the marginal utility of health care and the marginal
utility of numeraire consumption) may depend on the distinction between naivety and
20To see that @xi1;t+1=@g0;t > ��, recall from equation (14) that @xi1;t+1=@(g0;t�) 2 (�1; 0) and, as a
consequence, @xi1;t+1=@g0;t = �[@xi1;t+1=@(g0;t�)] > ��.
26
sophistication.
To see this, we may rewrite the young consumer�s �rst order condition for health care
services as follows (given that xi0;t > 0):
�@ui0;t@ci0;t
+ �i��@ui1;t+1@hi1;t+1
+�2@ui2;t+2@hi2;t+2
�
�+ �i0;t = 0 (42)
where �i0;t = 0 under naivety (as the young naive consumer does not act strategically
vis-a-vis his/her middle-aged self), whereas
�i0;t =�1� �i
��i�2
@ui2;t+2@hi2;t+2
@xi1;t+1@xi0;t
+�1� �i
��i�2
��1 + �i2;t+2
� @ui2;t+2@ci2;t+2
�@ui2;t+2@hi2;t+2
@xi1;t+1@bi1;t+1
�@si1;t+1@xi0;t
��1� �i
��i�2
@ui2;t+2@hi2;t+2
@~xi1;t+1@zi1;t+1
@li1;t+1@xi0;t
(43)
is generally nonzero under sophistication and re�ects an incentive faced by the young
consumer to a¤ect choices made by his/her middle-aged self. We can then derive the
following result:
Proposition 2 Suppose that either the mimicker or the low-ability type is crowded out
�rst, i.e., x20;t > min�x10;t; x
20;t
when g0;t = 0. Then, if the consumers have present-biased
preferences and are sophisticated, and if �10;t � 0, there exists a level of g0;t > 0 for which
the welfare is strictly higher than without public provision.
Proposition 2 follows by analogy to Proposition 1 by observing that
@V i0;t@mi
0;t
�@V i0;t@ci0;t
=�1� �i
���@ui1;t+1@hi1;t+1
+�2@ui2;t+2@hi2;t+2
�
�� �i0;t > 0, if �i0;t � 0. (44)
27
Note that �10;t � 0 is a su¢ cient - not necessary - condition for the right hand side
of equation (44) to be positive. As a consequence, the qualitative result indicated by
Proposition 2 also applies if �10;t > 0 and small enough in absolute value.
By comparison with the cost bene�t rule for public provision derived in the previous
subsection, it follows that the strategic incentive faced by the young sophisticated con-
sumer may either strengthen or counteract the result presented in Proposition 1. As we
indicated in Section 2, the �rst row of equation (43) is negative. Therefore, if the sum of
the second and third row of equation (43) is either negative or small in absolute value,
then �i0;t < 0.
An interesting example as to when the right hand side of equation (44) is positive is
where the nonnegativity constraint faced by each middle-aged self binds at a lower level of
g0;t than the corresponding nonnegativity constraint faced by the young self, meaning that
equation (38) should be evaluated for x11;t+1 = x21;t+1 = x
11;t+1 = 0. In this case, the right
hand side of equation (43) is equal to zero. The intuition is that if xi1;t+1 = 0 - and with
si0;t (which the government controls via the income tax system) held constant - there is no
channel via which xi0;t may a¤ect the �rst order conditions for li1;t+1 and s
i1;t+1 presented
in equations (17) and (18). This means that the policy rule for public provision takes the
same form as under naivety.
Pirttilä and Tenhunen (2008) have also examined paternalistic motives for publicly
provided private goods under optimal income taxation. Their study is based on a static
model where the objective of the social planner di¤ers from the objective faced by the
consumers. They �nd that it is welfare improving to publicly provide a private good that
is "undervalued" by the consumers (in the sense that the social marginal willingness to
pay exceeds the private marginal willingness to pay), if this good is either substitutable
for leisure (in which case the mimicker is crowded out before the low-ability type) or if
28
leisure is weakly separable from the other goods in the utility function. Although this
result has important similarities to our Proposition 1 above, an important di¤erence is
that we also �nd that public provision might be welfare improving if the low-ability type
is crowded out �rst. In a way similar to our study, Pirttilä and Tenhunen also give an
example where the consumers attach less value to their future health than preferred by
the government (which they interpret as hyperbolic discounting); yet, as they use a static
model, they are unable to distinguish between naivety and sophistication and, therefore,
identify how the strategic incentives faced by the consumers a¤ect the policy incentives
underlying publicly provided private goods. Furthermore, a static model does not capture
intertemporal consumption-adjustments over the individual life-cycle. As we indicated
above, it matters for the welfare e¤ect of public provision to the young generation whether
or not the individual�s young self becomes crowded out before his/her middle-aged self.
These intertemporal adjustments will be even more important in the context of public
provision to the middle-aged, to which we turn next.
3.2 Public Provision to the Middle-Aged
Without hyperbolic discounting, the conditions under which public provision of health
care to the middle-aged leads to higher welfare are analogous to those described for public
provision towards the young generation above. Therefore, we only examine the policy rule
for public provision under quasi-hyperbolic discounting here.
In a way similar to the notation used above, let
29
dmi0;t
dg1;t+1=
@xi0;t@g1;t+1
�@xi0;t@b11;t+1
(45)
dmi1;t+1
dg1;t+1= 1 +
�@xi1;t+1@g1;t+1
�@xi1;t+1@bi1;t+1
�+@xi1;t+1@mi
0;t
dmi0;t
dg1;t+1(46)
denote how the total consumption of health care services by ability-type i, when young
and when middle-aged, is a¤ected by a tax-�nanced increase in the provision of health
care services to the middle-aged in period t+1, g1;t+1. We show in the Appendix that the
cost bene�t rule for g1;t+1 can be written as
@W
@g1;t+1= �t
Xi
��@V i0;t@mi
0;t
�@V i0;t@ci0;t
�dmi
0;t
dg1;t+1+
�@V i0;t@mi
1;t+1
�@V i0;t@ci1;t+1
�dmi
1;t+1
dg1;t+1
�
+�t
"�@U20;t@m2
0;t
�@U20;t@c20;t
�dm2
0;t
dg1;t+1� @ bU20;t@ bm2
0;t
�@ bU20;t@bc20;t
!dbm2
0;t
dg1;t+1
#(47)
+�t
"�@U20;t@m2
1;t+1
�@U20;t@c21;t+1
�dm2
1;t+1
dg1;t+1� @ bU20;t@ bm2
1;t+1
�@ bU20;t@bc21;t+1
!dbm2
1;t+1
dg1;t+1
#
We can then use equation (47) to derive the following result:
Proposition 3 Suppose that x21;t+1 > min�x11;t+1; x
21;t+1
without any public provision.
Then, if the consumers have present-biased preferences, and irrespective of whether they
are characterized by naivety or sophistication, there exists a level of g1;t+1 > 0 for which the
welfare is strictly higher than without public provision, if the young generation is crowded
out before the middle-aged generation.
To see this result more clearly, suppose that all young agents have become crowded out
at g�1;t+1, meaning that dm10;t=dg1;t+1 = dm
20;t=dg1;t+1 = dm
20;t=dg1;t+1 = 0 for g1;t+1 � g�1;t+1.
30
Then, if the middle-aged low-ability type becomes crowded out at, say, g��1;t+1 > g�1;t+1, and
if the middle-aged mimicker is not yet crowded out at this point, meaning that x21;t+1 > 0
at g1;t+1 = g��1;t+1, equation (47) reduces to read
@W
@g1;t+1= �t
�@V 10;t@m1
1;t+1
�@V 10;t@c11;t+1
�dm1
1;t+1
dg1;t+1=�1� �1
��t+2
@u12;t+2@h12;t+2
> 0. (48)
By analogy, if the middle-aged mimicker is crowded out, while the middle-aged low-ability
type is not, equation (47) simpli�es to
@W
@g1;t+1= ��t
@ bU20;t@ bm2
1;t+1
�@ bU20;t@bc21;t+1
!dbm2
1;t+1
dg1;t+1> 0 (49)
as crowding out here means @ bU20;t=@ bm21;t+1 � @ bU20;t=@bc21;t+1 < 0 and dbm2
1;t+1=dg1;t+1 = 1.
The intuition as to why these results apply both under naivety and sophistication is, of
course, that the welfare e¤ect of public provision is governed solely by the instantaneous
utility change and behavioral response associated with the middle-aged low-ability type or
mimicker. Sophistication only gives rise to a strategic motive faced by the young consumers
(not the middle-aged), which are already crowded out by assumption.
On the other hand, if each middle-aged consumer is crowded out before his/her young
self, Proposition 3 no longer applies. In that case, dmi1;t+1=dg1;t+1 = 1 and dm
i0;t=dg1;t+1
is (most likely) negative at the point where the middle-aged ability-type i is crowded
out, suggesting that the �rst row on the right hand side of equation (47) can be either
positive or negative. Then, if g1;t+1 continues to increase, and we eventually reach the
point where the young consumer becomes crowded out, we may already have passed the
level of g1;t+1 at which @V i0;t=@mi1;t+1�@V i0;t=@ci1;t+1 switches sign from positive to negative.
As a consequence, the welfare e¤ect of public provision remains ambiguous here.
It is worth noticing that, although Proposition 3 applies both for naive and sophisti-
31
cated consumers, the distinction between naivety and sophistication is still important for
the outcome. Whether or not the consumers are �rst crowded out when young instead
of when middle-aged (meaning that the condition on which Proposition 3 is based will
apply) might depend on whether they are naive or sophisticated. In Section 2, we gave
some intuition as to why the young sophisticated consumer may reduce his/her own in-
vestment in health care to provide incentives for his/her middle-aged self to spend more
resources on health care services. Alternatively, a young naive consumer may spend less
resources on health care services than a young sophisticated consumer, simply because the
naive consumer underestimates his/her future marginal utility of health capital. These
two mechanisms can work in opposite directions. It is, therefore, inconclusive whether the
condition in Proposition 3 is more likely to apply for naive than sophisticated consumers
or vice versa.
Finally, Propositions 1, 2 and 3 together give a strong argument for public provision of
health care services both to the young and middle-aged. To see this, note that an increase
in g0;t up to the point where the young low-ability type or mimicker is crowded out makes
it more likely that the condition for welfare improving public provision to the middle-aged
in Proposition 3 is ful�lled, if the middle-aged generation is not yet crowded out.
4 Summary and Discussion
This paper develops an OLG model with two ability-types, where the consumers su¤er
from a self-control problem generated by quasi-hyperbolic discounting, to analyze the wel-
fare e¤ects of publicly provided private goods with long-term consequences for individual
well-being. Health care services are used to exemplify private goods with an explicit in-
tertemporal dimension: the bene�ts (or at least some of them) following the use of such
32
services are likely to arise in the future in the form of increased health capital, while
the cost arises at the time the investment is made. Therefore, the appearance of quasi-
hyperbolic discounting means that the health capital stock might become too small for
the individual himself/herself in a longer time-perspective, which provides a paternalistic
motive for public provision. The policy instruments faced by the government are non-
linear taxes on labor income and capital income as well as the expenditures associated
with publicly provided health care. To our knowledge, this is the �rst study dealing with
publicly provided private goods under quasi-hyperbolic discounting.
In our model, each consumer lives for three periods, which allows us to distinguish
between public provision to the young and the middle-aged as well as between naivety and
sophistication in terms of consumer behavior. We �nd that publicly provided health care to
the young generation is welfare improving under optimal income taxation, if the consumers
have present-biased preferences and are naive; a result which applies independently of
whether the mimicker is crowded out before the low-ability type or vice versa. The intuition
is that quasi-hyperbolic discounting leads the consumer to spend too little resources on
health care, while naivety means that the policy incentives are not distorted by strategic
consumer behavior. With sophistication, on the other hand, the young consumer acts
strategically vis-a-vis his/her middle-aged self which may, in turn, either increases or
decreases the demand for health care as young. If the strategic incentives contribute to
reduce the demand for private health care services among the young, then the policy
incentives underlying public provision are analogous to those under naivety. However,
if the strategic consumer behavior increases the demand for health care services, public
provision to the young generation is not necessarily welfare improving.
The policy incentives for public provision of health care services to the middle-aged
generation di¤er from those described above. We �nd that public provision to the middle-
33
aged is welfare improving if the young generation is crowded out before the middle-aged
generation. Furthermore, this result holds independently of whether the consumers are
naive or sophisticated, as this distinction only a¤ects the incentives facing the young
generation (which is already crowded out by assumption). If the middle-aged are crowded
out �rst, there will be a counteracting e¤ect following as the young may reduce their own
private consumption of health care in response to the anticipated policy-induced increase
when middle-aged.
We interpret our results to give a strong argument for publicly provided health care
to the young and the middle-aged. Public provision to the young leads by itself (most
likely) to higher welfare as well as increases the likelihood that the conditions for welfare
improving public provision to the middle-aged are ful�lled (by crowding out the private
demand for health care among the young).
Future research may take several directions, and we brie�y discuss two of them here.
First, it would be interesting to analyze the consequences of heterogeneity with respect
to the self-control problem in greater detail, such that this problem is only present for
part of the population, and where the self-control problem is not perfectly correlated with
ability (as it is in our paper). Our conjecture is that this scenario might change the
relevant tradeo¤s for public policy in fundamental ways, since the government must, in
this case, balance the incentive to correct for the self-control problem against the welfare
cost for those that do not su¤er from this problem (see O�Donoghue and Rabin, 2006, for
a study of optimal sin taxes in a similar context). Yet, the appearance of several sources of
unobserved heterogeneity is also likely to require a much more complex model than in the
present paper. Second, real world tax instruments may di¤er from those assumed here;
for instance, a linear capital income tax makes the government unable to perfectly control
the capital stock. In that case, public provision might also serve as an indirect instrument
34
to a¤ect the savings behavior. We leave these extensions for future study.
5 Appendix
Labor Supply and Savings Behavior by the Young Consumer
The �rst order conditions for work hours and saving, respectively, can be written as
@ui0;t@ci0;t
!i0;t �@ui0;t@zi0;t
= 0 (A1)
�@ui0;t@ci0;t
+ �i��1 + �i1;t+1
� @ui1;t+1@ci1;t+1
+�i�1� �i
��2@ui2;t+2@hi2;t+2
@xi1;t+1@bi1;t+1
�1 + �i2;t+2
�+�i
�1� �i
��2��1 + �i2;t+2
� @ui2;t+2@ci2;t+2
�@ui2;t+2@hi2;t+2
@xi1;t+1@bi1;t+1
�@si1;t+1@si0;t
��i�1� �i
��2@ui2;t+2@hi2;t+2
�@xi1;t+1@zi1;t+1
�@ui1;t+1=@z
i1;t+1
@ui1;t+1=@ci1;t+1
@xi1;t+1@bi1;t+1
�@li1;t+1@si0;t
= 0, (A2)
where !i0;t = wi0;t
�1� @T i0;t=@yi0;t
�and �i1;t+1 = r
i1;t+1
�1� @T i1;t+1=@I i1;t+1
�.
First Order Conditions for the Government
The Lagrangean corresponding to the optimization problem facing the government can be
written as
35
L =Ps
Pi
�s
ui0;s +
2Pj=1
�juij;s+j
!
+Ps
�s
(u20;s + �
22Pj=1
�ju2j;s+j � bu20;s � �2 2Pj=1
�jbu2j;s+j)
+Ps
sfPi
�wi0;sl
i0;s + w
i1;sl
i1;s
�� g0;s � g1;s
+Ks(1 + rs)�Ks+1 �Pi
�bi0;s + b
i1;s + b
i2;s
�g
+Ps
Pi
i
�i0;s�xi0;s � xi0;s
�bi0;s; z
i0;s; b
i1;s+1; z
i1;s+1; g0;s; g1;s+1
�+Ps
b�20;s �bx20;s � bx20;s �b10;s; bz20;s; bi1;s+1; bz21;s+1; g0;s; g1;s+1�+Ps
Pi
�i1;s+1�xi1;s+1 � xi1;s+1
�bi1;s+1; z
i1;s+1; (x
i0;s + g0;s)� + g1;s+1
�+Pt
b�21;s+1 �bx21;s+1 � bx21;s+1 �b11;s+1; bz21;s+1; (bx20;s + g0;s)� + g1;s+1� . (A3)
Instead of substituting the conditional commodity demand functions into the objective
function, we have followed the equivalent approach of introducing the conditional com-
modity demand function for one of the two goods, x, as separate restrictions. Then, by
using c = b� x, the �rst order conditions faced by generation t can be written as
@L
@b10;t= �t
@u10;t@c10;t
� �t@bu20;t@bc20;t � t � �10;t@x
10;t
@b10;t� b�20;t@bx20;t@b10;t
= 0 (A4)
@L
@b20;t=@u20;t@c20;t
��t + �t
�� t � �20;t
@x20;t@b20;t
= 0 (A5)
36
@L
@b11;t+1= �t+1
@u11;t+1@c11;t+1
� �t�1@bu21;t+1@bc21;t+1 � t+1 � �10;t @x
10;t
@b11;t+1
��11;t+1@x11;t+1@b11;t+1
� b�20;t @bx20;t@b11;t+1� b�21;t+1@bx21;t+1@b11;t+1
= 0 (A6)
@L
@b21;t+1=@u21;t+1@c21;t+1
��t+1 + �t�
2�� t+1 � �20;t
@x20;t@b21;t+1
� �21;t+1@x21;t+1@b21;t+1
= 0 (A7)
@L
@b12;t+2= �t+2
@u12;t+2@c12;t+2
� �t�1@bu22;t+2@bc22;t+2 � t+2 = 0 (A8)
@L
@b22;t+2=@u22;t+2@c22;t+2
��t+2 + �2�t
�� t+2 = 0 (A9)
@L
@l10;t= ��t
@u10;t@z10;t
+ �tw10;tw20;t
@bu20;t@bz20;t + tw10;t + �10;t@x
10;t
@z10;t+ b�20;tw10;tw20;t
@bx20;t@bz20;t = 0 (A10)
@L
@l20;t= �
��t + �t
� @u20;t@z20;t
+ tw20;t + �
20;t
@x20;t@z20;t
= 0 (A11)
37
@L
@l11;t+1= ��t+1
@u11;t+1@z11;t+1
+ �t�1w11;t+1w21;t+1
@bu21;t+1@z11;t+1
+ t+1w11;t+1 + �
10;t
@x10;t@z11;t+1
+�11;t+1@x11;t+1@z11;t+1
+ b�20;tw11;t+1w21;t+1
@bx20;t@bz21;t+1 + b�21;t+1w
11;t+1
w21;t+1
@bx21;t+1@bz21;t+1 = 0 (A12)
@L
@l21;t+1= �
��t+1 + �t�
2� @u21;t+1@z21;t+1
+ t+1w21;t+1 + �
20;t
@x20;t@z21;t+1
+ �21;t+1@x21;t+1@z21;t+1
= 0 (A13)
@L
@x10;t= �t
��@u10;t@c10;t
+
��@u11;t+1@h11;t+1
+�2@u12;t+2@h12;t+2
�
��
+�10;t � �11;t+1@x11;t+1@x10;t
= 0 (A14)
@L
@x20;t= �
��t + �t
� @u20;t@c20;t
+��t + �t�
2���@u21;t+1@h21;t+1
+�2@u22;t+2@h22;t+2
�
�
+�20;t � �21;t+1@x21;t+1@x20;t
= 0 (A15)
@L
@bx20;t = �t@bu20;t@bc20;t � �t�2
�@bu21;t+1@bh21;t+1 +�2
@bu22;t+2@bh22;t+2 �
!
+b�20;t � �21;t+1@bx21;t+1@bx20;t = 0 (A16)
38
@L
@x11;t+1= �t
���
@u11;t+1@c11;t+1
+�@u12;t+2@h12;t+2
�+ �11;t+1 = 0 (A17)
@L
@x21;t+1=��t + �t�
�2���@u21;t+1@c21;t+1
+�2@u22;t+2@h22;t+2
�+ �21;t+1 = 0 (A18)
@L
@bx21;t+1 = �t�2 �@bu21;t+1@bc21;t+1 ��2@bu
22;t+2
@bh22;t+2!+ �21;t+1 = 0 (A19)
@L
@Kt+j
= � t+j�1 + t+j(1 + rt+j) = 0 for j = 1; 2. (A20)
Welfare E¤ects of Public Provision
If the income taxes are optimal, i.e. the �rst order conditions given by equations (A4)-
(A20) are ful�lled, the welfare e¤ect of increased public provision of health care services
to the young generation is given by
@L
@g0;t= �t
Pi
��@ui1;t+1@hi1;t+1
+�2@ui2;t+2@hi2;t+2
�
+�t�2
"��@u21;t+1@h21;t+1
+�2@u22;t+2@h22;t+2
�� �@bu21;t+1@bh21;t+1 +�2
@bu22;t+2@bh22;t+2
!#� 2 t
�Pi
��i0;t
@xi0;t@g0;t
+ �i1;t+1@xi1;t+1@g0;t
�� b�20;t@bx20;t@g0;t
� �21;t+1@bx21;t+1@g0;t
. (A21)
39
Use equations (A4) and (A5) to solve for t and substitute into equation (A21)
@L
@g0;t= �t
Pi
��@ui1;t+1@hi1;t+1
+�2@ui2;t+2@hi2;t+2
�@ui0;t@ci0;t
�
+�t[
��2�
@u21;t+1@h21;t+1
+ �2�2@u22;t+2@h22;t+2
�@u20;t@c20;t
�
� �2�
@bu21;t+1@bh21;t+1 + �2�2
@bu22;t+2@bh22;t+2 �
@bu20;t@bc20;t
!]
�Pi
��i0;t
�@xi0;t@g0;t
�@xi0;t@bi0;t
�+ �i1;t+1
@xi1;t+1@g0;t
�
�b�20;t�@bx20;t@g0;t�@bx20;t@b10;t
�� �21;t+1
@bx21;t+1@g0;t
. (A22)
Then, use equations (A14), (A15) and (A16) to solve for �10;t, �20;t and �
10;t, respectively,
and substitute into equation (A22)
40
@L
@g0;t= �t
Pi
��@ui1;t+1@hi1;t+1
+�2@ui2;t+2@hi2;t+2
�@ui0;t@ci0;t
�
+�t[
��2�
@u21;t+1@h21;t+1
+ �2�2@u22;t+2@h22;t+2
�@u20;t@c20;t
�
� �2�
@bu21;t+1@bh21;t+1 + �2�2
@bu22;t+2@bh22;t+2 �
@bu20;t@bc20;t
!]
+�t��@u10;t@c10;t
+
��@u11;t+1@h11;t+1
+�2@u12;t+2@h12;t+2
���@x10;t@g0;t
�@x10;t@b10;t
�
+
����t + �t
� @u20;t@c20;t
+��t + �t�
2���@u21;t+1@h21;t+1
+�2@u22;t+2@h22;t+2
���@x20;t@g0;t
�@x20;t@b20;t
�
+
"�t@bu20;t@bc20;t � �t�2
�@bu21;t+1@bh21;t+1 +�2
@bu22;t+2@bh22;t+2
!#�@bx20;t@g0;t
�@bx20;t@b10;t
�
��11;t+1�@x11;t+1@g0;t
+@x11;t+1@x10;t
�@x10;t@g0;t
�@x10;t@b10;t
��
��21;t+1�@x21;t+1@g0;t
+@x21;t+1@x20;t
�@x20;t@g0;t
�@x20;t@b20;t
��
��21;t+1�@bx21;t+1@g0;t
+@bx21;t+1@bx20;t
�@bx20;t@g0;t
�@bx20;t@b10;t
��(A23)
Finally, use equations (A17), (A18) and (A19) to solve for �11;t+1, �21;t+1 and �
11;t+1, respec-
tively, substitute into equation (A23) and rearrange
41
@L
@g0;t= �t
Pi
��@ui1;t+1@hi1;t+1
+�2@ui2;t+2@hi2;t+2
�@ui0;t@ci0;t
��1 +
@xi0;t@g0;t
�@xi0;t@bi0;t
�
+�t
��2�
@u21;t+1@h21;t+1
+ �2�2@u22;t+2@h22;t+2
�@u20;t@c20;t
��1 +
@x20;t@g0;t
�@x20;t@b20;t
�
��t
�2�
@bu21;t+1@bh21;t+1 + �2�2
@bu22;t+2@bh22;t+2 �
@bu20;t@bc20;t
!�1 +
@bx20;t@g0;t
�@bx20;t@b10;t
�
+�tPi
��2@ui2;t+2@hi2;t+2
��@ui1;t+1@ci1;t+1
��@xi1;t+1@g0;t
+@xi1;t+1@xi0;t
�@xi0;t@g0;t
�@xi0;t@bi0;t
��
+�t�2
��2@u22;t+2@h22;t+2
��@u21;t+1@c21;t+1
��@x21;t+1@g0;t
+@x21;t+1@x20;t
�@x20;t@g0;t
�@x20;t@b20;t
��
��t�2 �2@bu22;t+2@bh22;t+2 ��
@bu21;t+1@bc21;t+1
!�@bx21;t+1@g0;t
+@bx21;t+1@bx20;t
�@bx20;t@g0;t
�@bx20;t@b10;t
��(A24)
which is equation (38) in the main text. Equation (36) appears in the special care where
�1 = �2 = 1.
By analogy, the welfare e¤ect of public provision of health care services to the middle-
aged can be written as
@L
@g1;t+1= �t+2
Pi
@ui2;t+2@hi2;t+2
+ �t�2�2
"@u22;t+2@h22;t+2
�@bu22;t+2@bh22;t+2
#� 2 t+1 (A25)
�Pi
��i0;t
@xi0;t@g1;t+1
+ �i1;t+1@xi1;t+1@g1;t+1
�� b�20;t @bx20;t@g1;t+1
� �21;t+1@bx21;t+1@g1;t+1
.
Equation (47) can then be derived in the same general way as equation (38). To derive
equation (47), solve equation (A7) for t+1 and substitute into equation (A25). Then, use
42
equations (A14), (A15) and (A16) to solve for �10;t, �20;t and �
10;t, respectively, and substitute
into the equation derived in the �rst step. Finally, in the new equation, substitute for
�11;t+1, �21;t+1 and �
11;t+1 by using equations (A17), (A18) and (A19), and rearrange to
obtain equation (47).
References
Aronsson, T. and Granlund, D. (2011) Public Goods and Optimal Paternalism under
Present-Biased Preferences. Economics Letters 113, 54-57.
Aronsson, T. and Johansson-Stenman, O. (2010) Positional Concerns in an OLG
Model: Optimal Labor and Capital Income Taxation. International Economic Review
51, 1071-1095.
Aronsson, T., Markström, M. and Sjögren, T. (2005) Public Provision of Private Goods
and Equilibrium Unemployment. FinanzArchiv 61, 353-367, 2005.
Aronsson, T. and Thunström, L. (2008) A Note on Optimal Paternalism and Health
Capital Subsidies. Economic Letters 101, 241-242.
Aronsson, T. and Sjögren, T. (2009) Quasi-Hyperbolic Discounting and Mixed Taxa-
tion. Umeå Economic Studies 778, Umeå University.
Aronsson, T., Sjögren, T. and Dalin, T. (2009) Optimal Taxation and Redistribution
in an OLGModel with Unemployment. International Tax and Public Finance 16, 198-218.
Atkinson, A. and Sandmo, A. (1980) Welfare Implications of the Taxation of Sav-
ings.Economic Journal 90, 529-548.
Bickel, W. K., Odum, A. L., and Madden, G. J. (1999) Impulsivity and cigarette
smoking: Delay discounting in current, never, and ex-smokers. Psychopharmacology 146,
447�454.
43
Blomquist, S. and Christiansen, V. (1995) Public Provision of Private Goods as a Redis-
tributive Device in an Optimum Income Tax Model. Scandinavian Journal of Economics
97, 547-567.
Blomquist, S. and Christiansen, V. (1998), Topping up or Opting out? The Optimal
Design of Public Provision Schemes. International Economic Review 39, 399-411.
Boadway, R. and Marchand, M. (1995) The use of Public Expenditures for Redistrib-
utive Purposes. Oxford Economic Papers 47, 45-59.
Brett, C. (1997) A Note on Nonlinear Taxation in an Overlapping Generations Model.
Mimeo.
Brett, C. and Weymark, J. (2008) Optimal Nonlinear Taxation of Income and Savings
Without Commitment. Working paper 09-W05, Department of Economics, Vanderbilt
University.
Brown, A., Chua, Z., and Camerer, C. (2009) Learning and Visceral Temptation in
Dynamic Saving Experiments. Quarterly Journal of Economics 124, 197-231.
Christensen-Szalanski, J.J. (1984) Discount functions and the measurement of patients�
values. Women�s decisions during childbirth. Medical Decision Making 4, 47-58.
DellaVigna, S. and Malmendier, U. (2006) Paying Not to Go to the Gym. American
Economic Review 96, 694�719.
DellaVigna, S. (2009) Psychology and Economics: Evidence from the Field. Journal
of Economic Literature 47, 315�372.
Diamond, P. and Köszegi, B. (2004) Quasi-Hyperbolic Discounting and Retirement.
Journal of Public Economics 87, 1839-1872.
Edwards, J., Keen, M. and Tuomala, M. (1994) Income Tax, Commodity Taxes and
Public Good Provision: A Brief Guide. FinanzArchiv 51, 472-487.
Fredreick, S., Loewenstein, G. and O�Donoghue, T. (2002) Time Discounting and Time
44
Preference: A Critical Review. Journal of Economic Literature 11, 351-401.
Gine, X., Karlan, D. and Zinman, J. (2010) Put Your Money Where Your Butt Is:
A Commitment Contract for Smoking Cessation. American Economic Journal: Applied
Economics 2, 213-235.
Grossman, M. (1972). On the concept of health capital and the demand for health.
Journal of Political Economy 80, 223-255.
Hey, J. and Lotito, G. (2009) Naive, resolute or Sophisticated? A Study of Dynamic
Decision Making. Journal of Risk and Uncertainty 38, 1-25.
Laibson, D. (1997) Golden Eggs and Hyperbolic Discounting. Quarterly Journal of
Economics 112, 443-477.
O�Donoghue, T. and Rabin, M. (1999) Doing it Now or Later. American Economic
Review, March, 103-124.
O�Donoghue, T. and Rabin, M. (2003) Studying Optimal Paternalism, Illustrated by
a Model of Sin Taxes. American Economic Review, May, 186-191.
O�Donoghue, T. and Rabin, M. (2006) Optimal Sin Taxes. Journal of Public Economics
90, 1825-1849.
Odum, A. L., Madden, G. J., and Bickel, W. K. (2002) Discounting of delayed health
gains and losses by current, never-and ex-smokers of cigarettes. Nicotine & Tobacco
Research 4, 295-303.
Phelps, E. and Pollak, R. (1968) On Second Best National Saving and Game Equilib-
rium Growth. Review of Economic Studies 35, 185-199.
Pirttilä, J. and Tenhunen, S. (2008) Pawns and Queens Revisited: Public Provision of
Private Goods when Individuals Make Mistakes. International Tax and Public Finance
15, 599-616.
Pirttilä, J. and Tuomala, M. (2001) On Optimal Non-Linear Taxation and Public
45
Good Provision in an Overlapping Generations Economy. Journal of Public Economics
79, 485-501.
Pirttilä, J. and Tuomala, M. (2002) Publicly Provided Private Goods and Redistribu-
tion: A General Equilibrium Analysis. Scandinavian Journal of Economics 104, 173-188.
Rubinstein, A. (2003) "Economics and Psychology"? The Case of Hyperbolic Dis-
counting. International Economic Review 44, 1207-1216.
Shapiro, J. M. (2005) Is there a daily discount rate? Evidence from the food stamp
nutrition cycle. Journal of Public Economics 89, 303�325.
Skiba, P. and Tobacman, J. (2008) Payday Loans, Uncertainty, and Discounting: Ex-
plaining Patterns of Borrowing, Repayment, and Default. Vanderbilt Law and Economics
Research Paper 08-33, Vanderbilt University.
Stern, N.H. (1982) Optimum Taxation with Errors in Administration. Journal of
Public Economics 17, 181-211.
Stiglitz, J.E. (1982). Self-selection and Pareto e¢ cient taxation. Journal of Public
Economics 17, 213�240.
Thaler, R. (1981) Some Empirical Evidence on Dynamic Inconsistency. Economic
Letters 8, 201-207.
Viscusi, K., Huber, J. and Bell, J. (2008) Estimating Discount Rates for Environmental
Quality from Utility-Based Choice Experiments. Journal of Risk and Uncertainty 37, 199-
220.
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